Zoology in the H\'enon family: twin babies and Milnor's swallows

Abstract

We study Cd,r-H\'enon-like families (fa\, b)a\, b with two parameters (a,b)∈ R2. We show the existence of an open set of parameters (a,b)∈ D, so that a renormalization chart conjugates an iterate of fa\, b to a perturbation of (x,y) ((x2+c1)2+c2,0). We prove that the map (a,b)∈ D (c1,c2) is a Cd-diffeomorphism; as first numerically conjectured by Milnor in 1992. Furthermore, we show the existence of an open set of parameters (a,b) so that fa\, b displays exactly two different renormalized H\'enon-like maps whose basins union attracts Lebesgue a.e. point with bounded forward orbit. A great freedom in the choice of the renormalized parameters enables us to deduce in particular the existence of a (unperturbed) H\'enon map with exactly 2 attracting cycles (an answer to a Question by Lyubich). The proof is based on a generalization of puzzle pieces for H\'enon-like maps, and on a generalization of both the affine-like formalism of Palis-Yoccoz and the cross map of Shilnikov. The distortion bounds enable us to define (for the first time) Cr and Cd,r-renormalizations and multi-renormalizations with bounds on all the derivatives.